Chaochao Yang scite author profile

This paper analyzes an interface-unfitted numerical method for distributed optimal control problems governed by elliptic interface equations. We follow the variational discretization concept to discretize the optimal control problems, and apply a Nitsche-eXtended finite element method to discretize the corresponding state and adjoint equations, where piecewise cut basis functions around the interface are enriched into the standard linear element space. Optimal error estimates of the state, co-state and control in a mesh-dependent norm and the L 2 norm are derived. Numerical results are provided to verify the theoretical results.

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Extended finite element methods for optimal control problems governed by Poisson equation in non-convex domains

Wang

Yang

Xie

2019

Sci. China Math.

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This paper analyzes two eXtended finite element methods (XFEMs) for linear quadratic optimal control problems governed by Poisson equation in non-convex domains. We follow the variational discretization concept to discretize the continuous problems, and apply an XFEM with a cut-off function and a classic XFEM with a fixed enrichment area to discretize the state and co-state equations. Optimal error estimates are derived for the state, co-state and control. Numerical results confirm our theoretical results.

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A Nitsche-eXtended finite element method for distributed optimal control problems of elliptic interface equations

Wang

Yang

Xie

2018

Preprint

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Chaochao Yang

An Interface-Unfitted Finite Element Method for Elliptic Interface Optimal Control Problems

A Nitsche-eXtended Finite Element Method for Distributed Optimal Control Problems of Elliptic Interface Equations

Extended finite element methods for optimal control problems governed by Poisson equation in non-convex domains

A Nitsche-eXtended finite element method for distributed optimal control problems of elliptic interface equations

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